The theory of ill-posed problems originated in an unusual way. As a rule, a new concept is a subject in which its creator takes a keen interest. The concept of ill-posed problems was introduced by Hadamard with the comment that these problems are physically meaningless and not worthy of the attention of serious researchers. Despite Hadamard's pessimistic forecasts, however, his unloved "child" has turned into a powerful theory whose results are used in many fields of pure and applied mathematics. What is the secret of its success? The answer is clear. Ill-posed problems occur everywhere and it is unreasonable to ignore them.Unlike ill-posed problems, inverse problems have no strict mathematical definition. In general, they can be described as the task of recovering a part of the data of a corresponding direct (well-posed) problem from information about its solution. Inverse problems were first encountered in practice and are mostly ill-posed. The urgent need for their solution, especially in geological exploration and medical diagnostics, has given powerful impetus to the development of the theory of ill-posed problems. Nowadays, the terms "inverse problem" and "ill-posed problem" are inextricably linked to each other.Inverse and ill-posed problems are currently attracting great interest. A vast literature is devoted to these problems, making it necessary to systematize the accumulated material. This book is the first small step in that direction. We propose a classification of inverse problems according to the type of equation, unknowns and additional information. We consider specific problems from a single position and indicate relationships between them. The problems relate to different areas of mathematics, such as linear algebra, theory of integral equations, integral geometry, spectral theory and mathematical physics. We give examples of applied problems that can be studied using the techniques we describe.This book was conceived as a textbook on the foundations of the theory of inverse and ill-posed problems for university students. The author's intention was to explain this complex material in the most accessible way possible. The monograph is aimed primarily at those who are just beginning to get to grips with inverse and ill-posed problems but we hope that it will be useful to anyone who is interested in the subject.
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Frontmatter
Preface
Denotations
Contents
Chapter 1. Basic concepts and examples
Chapter 2. Ill-posed problems
Chapter 3. Ill-posed problems of linear algebra
Chapter 4. Integral equations
Chapter 5. Integral geometry
Chapter 6. Inverse spectral and scattering problems
Chapter 7. Linear problems for hyperbolic equations
Chapter 8. Linear problems for parabolic equations
Chapter 9. Linear problems for elliptic equations
Chapter 10. Inverse coefficient problems for hyperbolic equations
Chapter 11. Inverse coefficient problems for parabolic and elliptic equations
Appendix A
Appendix B
Epilogue
Bibliography
Index
Kabanikhin, Sergey I.
Sergey I. Kabanikhin, Sobolev Institute of Mathematics, Novosibirsk, Russia.
Sergey I. Kabanikhin, Sobolev Institute of Mathematics, Novosibirsk, Russia.
